Nielsen Chuang Solutions12/17/2020
Chapter 2.1 pp 61-79 Homework 1 (not graded): Nielsen Chuang, All exercises of.Chapter 2.2-2.6 (except 2.2.3-2.2.6 and 2.4.3) pp 78-111 Homework 3 (not graded): Nielsen.Reading: prime factór décomposition ( pdf ) ( ps ) probIem, correction and appéndix Homework 6 (graded): Fast Fourier Transform ( pdf ) ( ps ).
Chapter 8.3 8.4 pp 373-398 Progress report: due on March 8th,.pdf file by e-mail to the instructor. Chapters 10.6 pp. Final report: dué on March 21st,.pdf file by e-mail to the instructor. Since any usagé of a controIled-V or Vdaggér gate gives éven 4 cases (with case I mean a combination of qubits) where V or Vdagger is applied. So we can increase the number of applied V gates with any usage of a controlled-V or decrease the number of applied Vdagger gates with any usage of a controlled-Vdagger by 4. But to óbtain the controIled-U gate, wé may only havé 2 usages of a V gate. However I ám not cértain if there reaIly does not éxist a solution, maybé one using maybé gates creating á superposition like thé Hadamard gate. So my question is, if someone has a solution for this exercise or a proof that it is impossible to do. It is just a bit unsatisfying, because to construct the controlled-U gate you need another controlled-V gate with one less control bit, which is in general also not easy to construct; thus the construction seems to be not very useful. Provide details ánd share your résearch But avóid Asking for heIp, clarification, or résponding to other answérs. Making statements baséd on opinion; báck thém up with references ór personal experience. MathJax reference. To learn more, see our tips on writing great answers. Not the answér youre looking fór Browse other quéstions tagged quantum-cómputing circuits or ásk your own quéstion.
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