id
processing priority
4
site type
3 (personal blog or private political site, e.g. Blogspot, Substack, also small blogs on own domains)
review version
11
html import
20 (imported)
first seen date
2024-03-09 02:15:39
expired found date
-
created at
2024-06-06 11:49:43
updated at
2025-12-29 09:11:47
length
18
crc
15853
tld
2211
nm parts
0
nm random digits
0
nm rare letters
0
is subdomain of id
-
previous id
0
replaced with id
0
related id
-
dns primary id
dns alternative id
0
lifecycle status
0 (unclassified, or currently active)
deleted subdomains
0
page imported products
0
page imported random
0
page imported parking
0
count skipped due to recent timeouts on the same server IP
0
count content received but rejected due to 11-799
0
count dns errors
0
count cert errors
0
count timeouts
0
count http 429
0
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0
count http 403
0
count http 5xx
0
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-
server bits
—
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-
mp import status
20
mp rejected date
-
mp saved date
-
mp size orig
377579
mp size raw text
66572
mp inner links count
29
mp inner links status
20 (imported)
title
Almost Sure
description
A random mathematical blog
site name
Almost Sure
author
updated
2025-12-17 04:05:31
raw text
Almost Sure – A random mathematical blog Skip to content Almost Sure A random mathematical blog Menu Stochastic Calculus Probability Theory Absolutely Sure About Spitzer’s Formula Spitzer’s formula is a remarkable result giving the precise joint distribution of the maximum and terminal value of a random walk in terms of the marginal distributions of the process. I have already covered the use of the reflection principle to describe the maximum of Brownian motion, and the same technique can be used for simple symmetric random walks which have a step size of ±1 . What is remarkable about Spitzer’s formula is that it applies to random walks with any step distribution. We consider partial sums for an independent identically distributed (IID) sequence of real-valued random variables X 1 , X 2 , … . This ranges over index n = 0, 1, … starting at S 0 = 0 and has running maximum Spitzer’s theorem is typically stated in terms of characte...
redirect type
30 (window.location)
block type
0 (no issues)
detected language
1 (English)
category id
Spam (233)
index version
2025110801
spam phrases
11
text nonlatin
189
text cyrillic
0
text characters
47957
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text sentences
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text paragraphs
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23
text matched phrases
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text matched dictionaries
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links self subdomains
0
links other subdomains
1 - math.uni.wroc.pl
links other domains
10 - jstor.org, mathoverflow.net, doi.org, rolandspeicher.com, scottaaronson.com, xorshammer.com
links spam adult
0
links spam random
0
links spam expired
0
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7
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0
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0
links ext booking
0
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0
links ext leaks
0
links ext ugc
53 - s0.wp.com, widgets.wp.com, almostsure.wordpress.com, wp.me, s1.wp.com, almostsure.files.wordpress.com, twitter.com, en.wikipedia.org, harfaw.wordpress.com, matheuscmss.wordpress.com, gottwurfelt.wordpress.com, gowers.wordpress.com, noncommutativegeometry.blogspot.com, sbseminar.wordpress.com, terrytao.wordpress.com, wordpress.com, en.wordpress.com
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0
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0
dol status
0
dol updated
2025-12-17 04:05:31
rss status
32 (unknown)
rss found date
2024-03-12 06:43:11
rss size orig
18994
rss items
10
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2
rss detected language
1 (English)
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-
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0 (new)
sitemap path
sitemap status
30 (processing completed, results pushed to table crawler_sitemaps.ext_domain_sitemap_lists)
sitemap review version
1
sitemap urls count
170
sitemap urls adult
0
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0
sitemap filtered videos
0
sitemap found date
2024-03-12 01:47:23
sitemap process date
2024-08-13 23:07:38
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-
sitemap last import date
-