Hierarchy of Lévy–laplacians and Quantum Stochastic Processes

Abstract: Communicated by O. SmolyanovWe consider a family of infinite dimensional Laplace operators which contains the classical Lévy-Laplacian. We prove a representation of these operators as a quadratic functions of quantum stochastic processes. Particularly, for the classical Lévy-Laplacian, the following formula is proved: ∆ L = lim ε→0 R s−t <ε bsbtdsdt, where bt is the annihilation process.

“…For the first time formula (4) was used for study of the exotic Lévy Laplacians in [9]. The Lévy Laplacians ∆ {en},s L are the particular case of nonclassical Lévy Laplacians (see [8,30]).…”

“…is the Schwartz space of rapidly decreasing functions and E * C = S * (R, C d ) is the space of generalized functions of slow growth. The case, where T = [0, 1] and {e n } is a basis consisting of trigonometric functions, is also often considered (see [3,4,5,30] where ξ ∈ E C , is called a coherent state. The unitary Wiener-Ito-Segal isomorphism j 2 between Γ(H C ) and L 2 (E * R , µ I ; C) is uniquely determined by the values on coherent states…”

“…The chain of the exotic Lévy Laplacians generated by a basis of trigonometric functions in the Hida calculus has been considered in papers [3,4,5]. Its extension for negative orders has been considered in the paper [30]. In fact, the Lévy Laplacian of order (−1) was first considered in [8].…”

“…This operator will be called the classical Lévy Laplacian. An extensive literature is devoted to the study of this operator (see the review [21], and also [30,5] and the papers cited there). The second Laplacian is defined using the Malliavin calculus.…”

Lévy Laplacians in Hida Calculus and Malliavin Calculus

“…For the first time formula (4) was used for study of the exotic Lévy Laplacians in [9]. The Lévy Laplacians ∆ {en},s L are the particular case of nonclassical Lévy Laplacians (see [8,30]).…”

“…is the Schwartz space of rapidly decreasing functions and E * C = S * (R, C d ) is the space of generalized functions of slow growth. The case, where T = [0, 1] and {e n } is a basis consisting of trigonometric functions, is also often considered (see [3,4,5,30] where ξ ∈ E C , is called a coherent state. The unitary Wiener-Ito-Segal isomorphism j 2 between Γ(H C ) and L 2 (E * R , µ I ; C) is uniquely determined by the values on coherent states…”

“…The chain of the exotic Lévy Laplacians generated by a basis of trigonometric functions in the Hida calculus has been considered in papers [3,4,5]. Its extension for negative orders has been considered in the paper [30]. In fact, the Lévy Laplacian of order (−1) was first considered in [8].…”

“…This operator will be called the classical Lévy Laplacian. An extensive literature is devoted to the study of this operator (see the review [21], and also [30,5] and the papers cited there). The second Laplacian is defined using the Malliavin calculus.…”

Lévy Laplacians in Hida Calculus and Malliavin Calculus

“…[16,18,17]). This operator is equal to zero on Γ(L 2 ([0, 1], R d )) (see [18] [8,26] 4 Stochastic Lévy Divergence…”

Stochastic Lévy differential operators and Yang–Mills equations

Lévy Laplacians and instantons