Conferencia magistral "Reflexiones sobre el Proceso Electoral 2023-2024", presentada por la consejera electoral del INE, Norma Irene de la Cruz. #INE#IEEM#deacasomos#fesacatlan
#HoyEnLaFes Celebramos el día internacional del #puma con el fin de reconocer la importancia del cuidado y la conservación de este gran felino, una especie emblemática no solo de México, sino de todo el continente Americano. #AcatlánMeEncanta#UNAM#nature
Hoy hace seis años que murió Maryan Mizarkhani, la primera mujer que ganó la medalla Fields. Se fue demasiado pronto, demasiado joven, y se ha convertido en un símbolo de la presencia de las mujeres matemáticas en la investigación del más alto nivel.
⏱️Faltan 5 días para el #4DeJunio. 🗳️
💡Toma en cuenta las siguientes recomendaciones para que salgas a votar este domingo #4DeJunio. 🙋🏽♂️🙋🏼♀️
👥Hagamos que esta elección se trate de construir juntos una mejor #democracia.
The Erdős-Tao encounter remains one of the most peculiar interactions in the history of mathematics. When Tao was merely 10, he met the eminent mathematician Paul Erdős during the latter's visit to Adelaide. Known for his distant demeanor with adults, Erdős held a fondness for engaging with children, whom he affectionately termed "epsilons."
To young Tao, Erdős was a kindly elderly figure, his celebrated stature in the world of mathematics unbeknownst to the child. Erdős treated Tao with an unusual maturity, speaking to him as an equal. This meeting would later take on profound significance when Erdős penned Tao's recommendation to Princeton, foreseeing his development into a formidable mathematician.
Though Erdős passed away in 1996, his influence on Tao's career trajectory was unmistakable, particularly kindling Tao's fascination with prime numbers. These seemingly randomly occurring numbers have puzzled mathematicians since Euclid's time, despite his proof of their infinity, as they searched for some hidden structure.
In 2015, Tao solved a long-standing mathematical conundrum known as the Erdős discrepancy, which began as a mathematical puzzle. Imagine that someone captures you and sticks you on a precipice. You can take only one step forward or one step backward without falling to your death. Can you construct an infinite set of steps that keeps you safe? Yes, if you alternate steps forward and backward, but suppose your captor gets to choose every third — or sixth — or some other numbered step for you. Now is there a sequence of steps that will keep you safe no matter what sequence your captor chooses? Erdős hypothesized an inevitable fall, but was unable to prove it, even offering a reward for a solution in the 1950s.
This Erdős-Tao interaction remains as a beautiful moment in mathematical history, remembered for the deep inspiration and ensuing achievements that transpired from the encounter between the fledgling and the established mathematician.
📢 Se lleva a cabo la presentación de las Urnas Electrónicas en la @FES_ACATLAN a cargo de Daniel Eduardo Flores Góngora de la DEOE. 🏫
🤝🏽Agradezco la presencia de la Consejera del @INEMexico Carla Humphrey @C_Humprey_J, la Consejera Presienta del @IEEM_MX Amalia Pulido @pulido_amalia y, por parte de la FES Acatlán, la Dra. Claudia Márquez Díaz y el Mtro. Fernando Israel González Trejo, y el Lic. Daniel Eduardo Flores Góngora, Director de Estadística y Documentación Electoral de la Dirección Ejecutiva de Organización Electoral del INE
En la presentación del Sistema "Candidatas y Candidatos Conóceles", por parte de la Mtra. @Paty_Lozano_ , una excelente herramienta para obtener información sobre los candidatos y sus propuestas.
👇
https://t.co/rRSH6PfbR3
📢 Hoy presentamos el Sistema "Candidatas y Candidatos Conóceles". Agradezco la participación del Director de la @FES_ACATLAN Dr. Manuel Martínez Justo, @imanol1959 y la Mtra. Nora del Consuelo Secretaria General Académica.
💻Sigue la transmisión en vivo: https://t.co/kEzhijLI05
📱Y no olvides consultar el Sistema "Candidatas y Candidatos Conóceles😉: https://t.co/pDLbmBBVNq