Definition 1. For p, q ∈ ℝ and $$, we define the L_p-curvature measure C_p,q(K, Q, ·) by the following:

Property 2. Suppose p, q ∈ ℝ. If $$, then

for each Borel set η⊆Sⁿ⁻¹. Here,

Property 3. Suppose p, q ∈ ℝ. If $$, then for each Borel set η⊆Sⁿ⁻¹,

Definition 4. For p, q ∈ ℝ and $$, the L_p,q-mixed volume, V_p,q(K, L, Q), of K and L (with respect to Q) is defined by the following:

Theorem 5. If reals p, q ≠ 0 and $$, then the L_p,q-mixed volume V_p,q(K, L, Q) via the variational formula of K and L (with respect to Q) by the following:

Theorem 6. Let $$ and q ≥ 1, p < 0. Then,

with equality if and only if K, L, Q are dilates when q > 1 and K, Q are homothetic when q = 1.

Definition 13. Suppose q ∈ ℝ. For $$, the q-th area measure S_q(K, Q, ·) is defined by the following:

Lemma 14. Let $$ and q ∈ ℝ. If each function f : Sⁿ⁻¹⟶ℝ is bounded and Borel, then

Proof. Because Equation (109) is shown by Equation (108) as an indicator function of the Borel set, we see that Equation (109) holds for a linear combination of the indicator functions of the Borel set, namely, simple functions ϕ : Sⁿ⁻¹⟶ℝ, is given by the following:

Proposition 15. Let p, q ∈ ℝ. If $$, then

Proof. From Equations (105), (109), and (84), we have for each Borel η⊆Sⁿ⁻¹,

Property 16. Let p, q ∈ ℝ. If $$. Then, for each Borel set η⊆Sⁿ⁻¹ and each bounded Borel function g : Sⁿ⁻¹⟶ℝ, we have the following:

Proof. Because $$ is a bounded Borel function, from Equation (109) with $$, we have the following:

By Equations (115), (89), and (90), and letting $$ and q = n in Equation (98), we have the following:

Remark 17. Equation (115) tells us the rationality for Definition 1 of the L_p-curvature measure C_p,q(K, Q, ·).

Example 18 (Lp-curvature measures of polytopes). Suppose $$ be a polytope with outer unit normal vectors v₁, v₂, ⋯, v_m. If Δ_i is a cone consisting of all rays emanating from the origin and passing through the face of P whose outer normal is v_i. Remember that we abbreviate $$ by $$, and from Equation (80), we get the following:

If η ⊂ Sⁿ⁻¹ is a Borel set such that {v₁, v₂, ⋯, v_m}∩η = ∅, then $$ has spherical Lebesgue measure 0. So, the L_p-curvature measure C_p,q(P, Q, ·) is discrete and concentrated on {v₁, v₂, ⋯, v_m}. From Proposition 15 and Equation (120), we have the following:

Example 19 (Lp-curvature measures of strictly convex bodies). Let $$ are strictly convex. Suppose g : Sⁿ⁻¹⟶ℝ is continuous, then we start with Equations (116) and (100)(taking $$) and combine the fact that ∂K/∂^′K has measure 0, it follows that

Example 20 (Lp-curvature measures of smooth convex bodies). Let $$ has a C² boundary with everywhere positive Gauss curvature. Because in this case, S(Q, ·) is absolutely continuous for the spherical Lebesgue measure; therefore, C_p,q(K, Q, ·) is absolutely continuous for the spherical Lebesgue measure, and from Equations (124), (94), and (47), we get the following:

Proposition 21. Let p, q ∈ ℝ and $$. If $$ with $$, then C_p,q(K_i, Q, ·)⟶C_p,q(K₀, Q, ·), weakly.

Proof. Let g : Sⁿ⁻¹⟶ℝ is continuous. From Equation (115) we know that

Thus,

It follows that C_p,q(K_i, Q, ·)⟶C_p,q(K₀, Q, ·), weakly. ☐

Proposition 22. Let p, q ∈ ℝ. If $$, then L_p-curvature measure C_p,q(K, Q, ·) is absolutely continuous with respect to the surface area measure S(K, ·).

Proof. Let η ⊂ Sⁿ⁻¹ be such that S(K, η) = 0, or equivalently by definition (Equation (96)), $$. Then, Equation (117) states that

Proposition 23. Suppose $$ and p, q ∈ ℝ. Then,

Proof. Let η ⊂ Sⁿ⁻¹ be a Borel set. From Equations (117) and (96), we have the following:

Therefore, we get Equations (131) and (133).

From Equations (117), (54), (90), and (96), we have the following:

Therefore, we get Equation (132). Similarly, we can get the rest.☐

Lemma 24. If $$ are such that K ∪ L is convex, then K and L may be approximated by sequences of bodies $$ that are both strictly convex and smooth and such that $$.

Theorem 25. Suppose p, q ∈ ℝ and $$. Then, the functional

Proof. We will use the fact that if $$ are such that $$, then h_K∪L = max{h_K, h_L} and h_K∩L = min{h_K, h_L}. We will also take advantage of the fact that ν_K and ν_L are defined $$ almost everywhere on the boundaries of K and L, respectively.

First of all, let us assume that K and L are both strictly convex. For a fixed θ ⊂ Sⁿ⁻¹, write θ as the union of three disjoint pieces θ = θ₀ ∪ θ_K ∪ θ_L, where

In this case, we have the following:

Alternatively, using Equation (117), this has

Similarly,

It is also the case that

In order to see the fact that the last one, we observe that the strict convexity of K and L forces x_K∪L(θ₀) = x_K∩L(θ₀).

Using the fact that C_p,q(K, ·, ·) is a measure in the third argument on Sⁿ⁻¹, combined with the fact that the union θ = θ₀ ∪ θ_K ∪ θ_L is disjoint, by adding Equations (145), (146), and (147) we obtain that

For any $$, we resort to Proposition 21 in order to use the weak continuity of C_p,q(·, Q, ·) in the first argument.☐

Lemma 26. Suppose Ω ⊂ Sⁿ⁻¹ be a closed set that is not contained in any closed hemisphere of Sⁿ⁻¹. Let ρ₀ : Ω⟶(0, ∞) and g : Ω⟶ℝ be continuous. If 〈ρ_t〉 is a logarithmic family of convex hulls of (ρ₀, g) and q ∈ ℝ, then

Proof. Obviously,

Therefore,

Since 〈ρ₀〉 and $$ are two convex bodies in $$, and $$ as t⟶0, there exist m₀, m₁ ∈ (0, ∞) and δ₀ > 0 such that

It is easily seen that s − 1 ≥ logs whenever s ∈ (0, 1), whereas s − 1 ≤ M₁logs whenever s ∈ [1, M₁]. Thus,

It follows that

Let $$. Since o(t, ·)/t⟶0 as t⟶0 uniformly on Ω, we may choose δ₁ > 0 so that for all t ∈ (−δ₁, δ₁), we have |o(t, ·)| ≤ |t| on Ω. From Equation (151) and the definition of M₀, we immediately see that

Theorem 27. Let Ω ⊂ Sⁿ⁻¹ is a closed set not contained in any closed hemisphere of Sⁿ⁻¹. If ρ₀ : Ω⟶(0, ∞) and g : Ω⟶ℝ are continuous, and 〈ρ_t〉 is a logarithmic family of convex hulls of (ρ₀, g), then for $$ and q ≠ 0,

Proof. Abbreviate $$ by η₀. Recall that η₀ is the set of spherical Lebesgue measure zero that consists of the complement, in Sⁿ⁻¹, of the regular normal vectors of the convex body K^∗. Note that the continuous function

Let v ∈ Sⁿ⁻¹/η₀. To see that $$, let

and hence $$. Because in addition to $$ obviously belonging to K^∗, it also belongs to $$. But v is a regular normal vector of K^∗, and therefore, $$. Then,

From this, Equation (168), Equation (52), and Lemma 9 yield the following facts:

As Ω is closed, by using the Tietze extension theorem, extend the continuous function g : Ω⟶ℝ to a continuous function $$. Therefore, using Equation (169) we see that

Using Equation (22), the fact that η₀ has measure zero, Equation (51), Equation (154), the dominated convergence theorem, Lemma 26, Equation (86), Equation (170), Lemma 14, and again Equation (170), we have the following:

☐

Theorem 28. Suppose Ω ⊂ Sⁿ⁻¹ is a closed set not contained in any closed hemisphere of Sⁿ⁻¹. Let h₀ : Ω⟶(0, ∞) and f : Ω⟶ℝ be continuous, and [h_t] be a logarithmic family of Wulff shapes associated with (h₀, f). If $$, then for q ≠ 0,

Proof. The logarithmic family of Wulff shape [h_t] is defined as the Wulff shape of h_t, where h_t is given by the following:

Let $$. Then,

Let 〈ρ_t〉 be the logarithmic family of convex hulls associated with (ρ₀, −f). Then from Lemma 7, we obtain that

Theorem 29. If $$ and g : Sⁿ⁻¹⟶ℝ is continuous, then for q ≠ 0,

Proof. In Theorem 27, let $$. Then, $$. In particular, from (53) we have $$.☐

Theorem 30. If $$ and f : Sⁿ⁻¹⟶ℝ is continuous, then for q ≠ 0,

Proof. The logarithmic family of Wulff shapes [Q, f, o, t] is defined by the Wulff shape [h_t], where

This, and the fact that $$, allows us to define

Therefore, Theorem 30 now follows directly from Theorem 29.☐

Theorem 31. If p, q ∈ ℝⁿ and $$, then for p ≠ 0, q ≠ 0,

Proof. For small t, h_t is defined by the following:

From Equations (61) and (62), the Wulff shape [h_t] = Q+_pt · L. For sufficiently small t, it follows from Equation (191) that

Let $$ when p ≠ 0, and let f = logh_L when p = 0. The required formulas now follow Theorem 30 and Equation (105).☐

Theorem 32. Suppose p, q ∈ ℝ. For $$,

Theorem 33. Suppose q ≠ 0. If $$, then

Proof. Let

From Equation (58) we know the Wulff space [h_t] = (1 − t) · Q+₀t · L. From the above definition of h_t, it follows immediately that for sufficiently small t,

Let f = logh_L/h_Q. The desired formulas now follow directly from Theorem 30.☐

Theorem 34. If p ≠ 0 and q ≠ 0, then for all $$ and ϕ ∈ SL(n),

Proof. Obviously, the case p ≠ 0 and q = 0 is handled by Equation (200). The case p = 0 and q ≠ 0 is handled by Equation (201), while the case p = 0 and q = 0 is handled by Equation (202).

We adopt the methods and techniques of paper [4]. Recall that Haberl and Parapatits refer to the [9] classified measure-valued operators on $$, which are SL(n)-inverse degree p and corresponding to the transformation behavior in Theorem 34. From Equations (63), (65), and (186), we see that for all $$ and all ϕ ∈ SL(n),

By Definition 8, and note the important fact that support functions are positively homogeneous of degree 1, from Equations (45) and (204), we have the following:

This shows that the measures $$ and C_p,q(ϕK, ϕQ, ·) when integrated against the p-th power of support functions of bodies in $$ are identical; thus, Lemma 12 now indicates that

The proof for Equation (200) is the same as the proof for Equation (199): As long as p ≠ 0, it will be the case that Equation (204) continues to hold even if q = 0 provided we appeal to Equations (188) and (71) when previously we had turned to Equations (188) and (65).

From Equations (63), (65), and (194), we know that for all $$ and all ϕ ∈ SL(n),

In Equation (207), choose L = B. Then, by Equation (45), we see that $$, and (6.15) becomes the following form:

Equivalently,

The proof of Equation (202) is identical to the proof of Equation (201) except that instead of appealing to Equations (194) and (65) we appeal to Equations (195) and (71).☐

Definition 35. Let p, q ∈ ℝ and $$. The L_p,q-mixed volume V_p,q(K, L, Q) is defined by the following:

Proposition 36. Suppose p, q ∈ ℝ. If $$, then

Proof. Identity (Equations (219)–(221)) follow from Equation (22) and Equation (34) (or Equation (217)). Similarly, we can prove Equations (222) and (223).

Proposition 37. The L_p,q -mixed volume V_p,q is SL(n)-invariant. That is, for p, q ∈ ℝ, $$, and ϕ ∈ SL(n),

Proof. For p = 0, the conclusion follows from Equation (223) and the SL(n)-invariance of L_p-mixed volumes (Equation (65)). We assume p ≠ 0. By Definition 35, Equation (199), and Equation (200), the fact that support functions are positively homogeneous of degree 1, Equation (45), and Definition 8, we have the following:

From the dual Equation (217) of L_p,q-mixed volume and Equation (44), we have for real λ > 0,

Theorem 38. Suppose p, q are such that q ≥ 1 and p < 0. If $$, then

Proof. From Equations (21) and (217), we have the following:

From this, by the Hölder inequality (see [47]), the dual integral formulation (Equation (22)) of L_p-mixed volume and L_p-Minkowski inequality (Equation (11)), we have the following:

Proposition 39. The L_p,q-mixed volume V_p,q(K, L, Q) is a valuation over $$ with respect to all K, L, and Q.

Proof. The L_p,q-mixed volume V_p,q(K, L, Q) is a valuation on $$ respect to the third argument can be seen easily by writing Equation (216) as follows:

Together with Equations (216) and (232), we have the following:

Namely, V_p,q(K, L, Q) is a valuation in the third argument.

Observing that for $$ such that $$. Then, we have the following:

Note that $$ and $$. Together with Equations (216) and (234), we see that V_p,q(K, L, Q) is a valuation in the second argument, i.e,

Note that if $$ are such that $$, then we have the following:

Together with Equations (218) and (236), we see that V_p,q(K, L, Q) is a valuation in the first argument, i.e,

Let $$. The q-th mixed cone-volume measure C_q(K, Q, ω) of K and Q is a Borel measure on the unit sphere Sⁿ⁻¹ is defined by for a Borel ω⊆Sⁿ⁻¹ and u ∈ ω,

Since the q-th mixed volume, V_q(K, Q) has a dual integral formulation:

We can turn the q-th mixed cone-volume measure into the probability measure on the unit sphere by normalizing it by q-th mixed volume of the bodies. The q-th mixed cone-volume probability measure $$ of K and Q is defined by the following:

If $$, then for each real p, q ∈ ℝ, we define the normalized L_p,q-mixed volume by the following:

Let p⟶0. We give the following:

The q-th mixed entropy E_q(K, L, Q) of convex bodies $$ is defined by the following:

In particular,

☐

Problem 40. Let p, q ∈ ℝ, and $$ is fixed. Given a Borel measure $$, what are necessary and sufficient conditions on μ such that there exists a $$ whose L_p-curvature measures C_p,q(K, Q, ·) is the given measure μ?

Problem 41. For fixed p, q ∈ ℝ and $$, if $$ such that

Theorem 42. Let $$ be polytopes and let $$. Suppose

Proof. According to Equations (121) and (122), we get that the curvature measures of polytopes are discrete, and that C_p,q(P, Q, ·) = C_p,q(P^′, Q, ·) implies that P and P^′ must have the same outer unit normal vectors v₁, v₂, ⋯, v_m and

Here Δ_i and Δ′_i are the cones formed by the origin and the facets of P and P^′ with vector v_i, respectively.

Assume that P ≠ P^′. Tt is easy to see that P⊆P^′ is not possible. Set λ be the maximal number with λP⊆P^′. This has λ < 1. Since λP and P^′ have the same outer unit normal vectors, there is a facet of λP which is contained in a facet of P^′. The outer unit normal vector of those facets is denoted by $$. It follows that

Thus,

But λ < 1 implies that λ^n−q > 1 if q > n. Obviously, this is a contradiction.☐