Maybe it’s just my browser, but it look like it got cut off. Here’s the last of what it renders for me:
Averaging the previous inequality over kk, we get
1N∑k=0N−1R?k≤(1−γT)∑n=0∞γnTE[E[U!n∣J!n=K, Z!nT]−E[U!n∣Z!nT]]+O(1−γTη2+τ¯(1−γ)1−γT) 1N∑k=0N−1R?k≤(1−γT)∑n=0∞γnTE[E[Un!∣Jn!=K, ZnT!]−E[Un!∣ZnT!]]+O(1−γTη2+τ¯(1−γ)1−γT)
$${k=0}{N-1}R{?k} (1-^T){n=0}{nT} [[U^!_n ^!n = K, Z^!{nT}]-[U^!n Z^!{nT}]] + O(+
Indeed there is some kind of length limit in the website. I moved Appendices B and C to a separate post.
Unfortunately, it’s not just your browser. The website truncates the document for some reason. I emailed Matthew about it and ey are looking into it.
Maybe it’s just my browser, but it look like it got cut off. Here’s the last of what it renders for me:
Averaging the previous inequality over kk, we get
1N∑k=0N−1R?k≤(1−γT)∑n=0∞γnTE[E[U!n∣J!n=K, Z!nT]−E[U!n∣Z!nT]]+O(1−γTη2+τ¯(1−γ)1−γT) 1N∑k=0N−1R?k≤(1−γT)∑n=0∞γnTE[E[Un!∣Jn!=K, ZnT!]−E[Un!∣ZnT!]]+O(1−γTη2+τ¯(1−γ)1−γT)
$${k=0}{N-1}R{?k} (1-^T){n=0}{nT} [[U^!_n ^!n = K, Z^!{nT}]-[U^!n Z^!{nT}]] + O(+
Indeed there is some kind of length limit in the website. I moved Appendices B and C to a separate post.
Unfortunately, it’s not just your browser. The website truncates the document for some reason. I emailed Matthew about it and ey are looking into it.