Chasing infinity with matrix product states by embracing divergences
In this paper, we present a formalism for representing infinite systems in quantum mechanics by employing a strategy that embraces divergences rather than avoiding them. We do this by representing physical quantities such as inner products, expectations, etc., as maps from natural numbers to complex...
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| Main Author | |
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| Format | Journal Article |
| Language | English |
| Published |
27.09.2013
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| Subjects | |
| Online Access | Get full text |
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| Summary: | In this paper, we present a formalism for representing infinite systems in
quantum mechanics by employing a strategy that embraces divergences rather than
avoiding them. We do this by representing physical quantities such as inner
products, expectations, etc., as maps from natural numbers to complex numbers
which contain information about how these quantities diverge, and in particular
whether they scale linearly, quadratically, exponentially, etc. with the size
of the system. We build our formalism on a variant of matrix product states, as
this class of states has a structure that naturally provides a way to obtain
the scaling function. We show that the states in our formalism form a module
over the ring of functions that are made up of sums of exponentials times
polynomials and delta functions. We analyze properties of this formalism and
show how it works for selected systems. Finally, we discuss how our formalism
relates to other work. |
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| DOI: | 10.48550/arxiv.1309.7174 |