Feynman averaging of semigroups generated by Schrödinger operators

Borisov, Leonid Andreevich; Orlov, Yurii Nikolaevich; Сакбаев, В. Ж.

doi:10.1142/s0219025718500108

Cited by 12 publications

(9 citation statements)

References 12 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Then L is a second order uniformly elliptic operator and the family (F (t)) t≥0 in (10) has the following view: F (0) ∶= Id and for all t > 0 and all ϕ ∈ X…”

Section: 2mentioning

confidence: 99%

“…Case 1: X = C ∞ (R d ), (ξ t ) t≥0 is a Feller process whose generator L is given by ( 6) with A, B, C of the class C 2,α , A satisfies (11), and either N ≡ 0 or N ≠ 0 and the non-local term of L is a relatively bounded perturbation of the local part of L with some extra assumption on jumps of the process (see details in [22,24]). The family (F (t)) t≥0 is given by (10) (see also (17), or (12) in the corresponding particular cases) and D = C 2,α c (R d ). Further, Ω is a bounded C 4,α −smooth domain, Y = C 0 (Ω), BC are the homogeneous Dirichlet boundary/external conditions corresponding to killing of the process upon leaving the domain Ω.…”

Section: 2mentioning

confidence: 99%

“…Case 3: shifts and averaging. One more approach to construct Chernoff approximations for semigroups and Schrödinger groups generated by differential and pseudo-differential operators is based on shift operators (see [63,64]), averaging (see [10,57]) and their combination (see [10,9]). Let us demonstrate this method by means of simplest examples.…”

Section: 2mentioning

confidence: 99%

“…• averaging of semigroups (see Sec. 2.7, [10,57,10,9]); Moreover, Chernoff approximations have been obtained for some stochastic Schrödinger type equations in [55,54,56,37]; for evolution equations with the Vladimirov operator (this operator is a p-adic analogue of the Laplace operator) in [68,69,67,66,65]; for evolution equations containing Lévy Laplacians in [2,1]; for some nonlinear equations in [58].…”

mentioning

confidence: 99%

See 3 more Smart Citations

The method of Chernoff approximation

Butko

2019

Preprint

View full text Add to dashboard Cite

This survey describes the method of approximation of operator semigroups, based on the Chernoff theorem. We outline recent results in this domain as well as clarify relations between constructed approximations, stochastic processes, numerical schemes for PDEs and SDEs, path integrals. We discuss Chernoff approximations for operator semigroups and Schrödinger groups. In particular, we consider Feller semigroups in R d , (semi)groups obtained from some original (semi)groups by different procedures: additive perturbations of generators, multiplicative perturbations of generators (which sometimes corresponds to a random time-change of related stochastic processes), subordination of semigroups / processes, imposing boundary / external conditions (e.g., Dirichlet or Robin conditions), averaging of generators, "rotation" of semigroups. The developed techniques can be combined to approximate (semi)groups obtained via several iterative procedures listed above. Moreover, this method can be implemented to obtain approximations for solutions of some time-fractional evolution equations, although these solutions do not posess the semigroup property.

show abstract

“…Then L is a second order uniformly elliptic operator and the family (F (t)) t≥0 in (10) has the following view: F (0) ∶= Id and for all t > 0 and all ϕ ∈ X…”

Section: 2mentioning

confidence: 99%

Section: 2mentioning

confidence: 99%

Section: 2mentioning

confidence: 99%

mentioning

confidence: 99%

See 2 more Smart Citations

The method of Chernoff approximation

Butko

2019

Preprint

View full text Add to dashboard Cite

show abstract

“…Translation-invariant (or shift-invariant) measures are used for the study of solutions to differential equations based on mathematical expectations of functionals of random walks. Application of translation-invariant measures to representations of solutions to differential equations can be found in [2,4], where strongly continuous one-parameter operator semigroups that solve Cauchy problems for the diffusion equation, the fractional diffusion equation, and the Schrödinger equation with various Hamiltonians were obtained by averaging of random one-parameter families of operators of shifts by vectors of the coordinate space by measures defined on a set of shift operators. Thus approach to the study of properties of solutions to differential equations for functions on infinitedimensional spaces requires the analysis of measures on infinite-dimensional spaces that are invariant under shifts by vectors of this space or under other transformation groups (see [6]).…”

mentioning

confidence: 99%

Analogs of the Lebesgue Measure in Spaces of Sequences and Classes of Functions Integrable with Respect to These Measures

Завадский

2020

J Math Sci

View full text Add to dashboard Cite

We examine translation-invariant measures on Banach spaces lp, where p ∈ [1, ∞]. We construct analogs of the Lebesgue measure on Borel σ-algebras generated by the topology of pointwise convergence (σ-additive, invariant under shifts by arbitrary vectors, regular measures). We show that these measures are not σ-finite. We also study spaces of functions integrable with respect to measures constructed and prove that these spaces are not separable. We consider various dense subspaces in spaces of functions that are integrable with respect to a translation-invariant measure. We specify spaces of continuous functions, which are dense in the functional spaces considered. We discuss Borel σ-algebras corresponding to various topologies in the spaces lp, where p ∈ [1, ∞]. For p ∈ [1, ∞), we prove the coincidence of Borel σ-algebras corresponding to certain natural topologies in the given spaces of sequences and the Borel σ-algebra corresponding to the topology of pointwise convergence. We also verify that the space l∞ does not possess similar properties.Keywords and phrases: translation-invariant measure, topology of pointwise convergence, Borel σalgebra, space of integrable functions, approximation of integrable functions by continuous functions.

show abstract

Chernoff approximations of Feller semigroups in Riemannian manifolds

Mazzucchi

Moretti

Remizov³

et al. 2022

Mathematische Nachrichten

View full text Add to dashboard Cite

Chernoff approximations of Feller semigroups and the associated diffusion processes in Riemannian manifolds are studied. The manifolds are assumed to be of bounded geometry, thus including all compact manifolds and also a wide range of non-compact manifolds. Sufficient conditions are established for a class of second order elliptic operators to generate a Feller semigroup on a (generally non-compact) manifold of bounded geometry. A construction of Chernoff approximations is presented for these Feller semigroups in terms of shift operators. This provides approximations of solutions to initial value problems for parabolic equations with variable coefficients on the manifold. It also yields weak convergence of a sequence of random walks on the manifolds to the diffusion processes associated with the elliptic generator. For parallelizable manifolds this result is applied in particular to the representation of Brownian motion on the manifolds as limits of the corresponding random walks.

show abstract

Feynman averaging of semigroups generated by Schrödinger operators

Cited by 12 publications

References 12 publications

The method of Chernoff approximation

The method of Chernoff approximation

Analogs of the Lebesgue Measure in Spaces of Sequences and Classes of Functions Integrable with Respect to These Measures

Chernoff approximations of Feller semigroups in Riemannian manifolds

Contact Info

Product

Resources

About