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Introduction to MERA Sukhwinder Singh Macquarie University.

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Presentation on theme: "Introduction to MERA Sukhwinder Singh Macquarie University."— Presentation transcript:

1

2 Introduction to MERA Sukhwinder Singh Macquarie University

3 Multidimensional array of complex numbers Tensors

4 Cost of Contraction a bc a d =

5

6 Made of layers

7 Disentanglers & Isometries

8 Different ways of looking at the MERA 1.Coarse-graining transformation. 2.Efficient description of ground states on a classical computer. 3.Quantum circuit to prepare ground states on a quantum computer. 4.A specific realization of the AdS/CFT correspondence.

9 Coarse-graining transformation Length Scale

10 Coarse-graining transformation

11 Layer is a coarse-graining transformation

12 Coarse graining of operators

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19 Scaling Superoperator

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21 MERA defines an RG flow Wavefunction on coarse-grained lattice with two sites

22 Types of MERA

23 Binary MERATernary MERA

24 Different ways of looking at the MERA 1.Coarse-graining transformation. 2.Efficient description of ground states on a classical computer. 3.Quantum circuit to prepare ground states on a quantum computer. 4.A specific realization of the AdS/CFT correspondence.

25 Expectation values from the MERA

26 “Causal Cone” of the MERA

27 But is the MERA good for representing ground states? Claim: Yes! Naturally suited for critical systems.

28 Recall! 1)Gapped Hamiltonian  2)Critical Hamiltonian 

29 In any MERA Correlations decay polynomially Entropy grows logarithmically

30 Correlations in the MERA

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32 Entanglement entropy in the MERA

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39 Therefore MERA can be used a variational ansatz for ground states of critical Hamiltonians

40 Different ways of looking at the MERA 1.Coarse-graining transformation. 2.Efficient description of ground states on a classical computer. 3.Quantum circuit to prepare ground states on a quantum computer. 4.A specific realization of the AdS/CFT correspondence.

41

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43 Time Space

44 Different ways of looking at the MERA 1.Coarse-graining transformation. 2.Efficient description of ground states on a classical computer. 3.Quantum circuit to prepare ground states on a quantum computer. 4.A specific realization of the AdS/CFT correspondence.

45 Figure Source: Evenbly, Vidal 2011

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47 MERA and spin networks

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49 (Wigner-Eckart Theorem)

50 MERA and spin networks

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53 Summary – MERA can be seen as.. 1.As defining a RG flow. 2.Efficient description of ground states on a classical computer. 3.Quantum circuit to prepare ground states on a quantum computer. 4.Specific realization of the AdS/CFT correspondence.

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